Cubic Sp-Line Interpolation for Forth Order Polynomial Function

Yash Sharma; Suresh Sorathia; Kuldeep Shukla

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Reseach Article

Cubic Sp-Line Interpolation for Forth Order Polynomial Function

by Yash Sharma, Suresh Sorathia, Kuldeep Shukla

International Journal of Computer Applications

Foundation of Computer Science (FCS), NY, USA

Volume 86 - Number 2

Year of Publication: 2014

Authors: Yash Sharma, Suresh Sorathia, Kuldeep Shukla

10.5120/14954-3120

Yash Sharma, Suresh Sorathia, Kuldeep Shukla . Cubic Sp-Line Interpolation for Forth Order Polynomial Function. International Journal of Computer Applications. 86, 2 ( January 2014), 1-3. DOI=10.5120/14954-3120

@article{ 10.5120/14954-3120,

author = { Yash Sharma, Suresh Sorathia, Kuldeep Shukla },

title = { Cubic Sp-Line Interpolation for Forth Order Polynomial Function },

journal = { International Journal of Computer Applications },

issue_date = { January 2014 },

volume = { 86 },

number = { 2 },

month = { January },

year = { 2014 },

issn = { 0975-8887 },

pages = { 1-3 },

numpages = {9},

url = { https://ijcaonline.org/archives/volume86/number2/14954-3120/ },

doi = { 10.5120/14954-3120 },

publisher = {Foundation of Computer Science (FCS), NY, USA},

address = {New York, USA}

}

%0 Journal Article

%1 2024-02-06T22:03:08.225745+05:30

%A Yash Sharma

%A Suresh Sorathia

%A Kuldeep Shukla

%T Cubic Sp-Line Interpolation for Forth Order Polynomial Function

%J International Journal of Computer Applications

%@ 0975-8887

%V 86

%N 2

%P 1-3

%D 2014

%I Foundation of Computer Science (FCS), NY, USA

Abstract

When any higher order polynomial function performed as a time signal then the resultant graph may be distorted. Function generator cannot generate ten power pera unit frequency this signals also needs some slant average value. This demerit has been removed under in cubic sp-line. Due to the third order polynomial function has performed with its average approximation. In this paper we generate the signal apply interpolation formula on it and make it smooth and accurate. Finally we compare without and with cubic sp-line interpolation graphs. This algorithm performed in MatLab.

References

Carl De Boor, "Engineering Mathematics", Pearson Publication, 2nd Edition, Year-2006, pp. 848-849 and pp. 861-866.
Samuel D. Conte, "Elementary Numerical Analysis An Algorithmic Approach", Tata McGraw Hill, 3rd Edition, Year-2005, pp. 251-293.

Index Terms

Computer Science

Information Sciences

Keywords

Interpolation Cubic Sp-Line Node Description Tri-Diagonal System Decomposition Forward Substitution Backward Substitution